Algebraic methods in periodic singular Liouville equations

Abstract

We explain how algebraic geometry comes into play in the study of non-linear mean field (singular Liouville) equations u + eu = 4π Σi = 1N i δpi on a flat torus E = C/, where N, 1, …, N ∈ N, pi ∈ E are distinct points, and δpi is the Dirac measure at pi. The case with one singular source (N = 1) had been studied extensively in recent years. We start with a survey of this case with emphasizes on the constructions of Lam\'e curves Xn and pre-modular forms Zn(σ, τ) which encodes the structure of solutions of the PDE. We then discuss extensions to the case of general N. The basic tool is the monodromy theory for generalized Lam\'e equations. Two aspects are discussed: (1) For := Σi = 1N i being odd, an exact counting formula of algebraic degree is proved. (2) For being even, the existence of generalized Lam\'e curves parametrizing logarithmic-free solutions is proposed.